Factoring groups into dense subsets
Abstract
Let G be a group of cardinality >0 endowed with a topology τ such that |U|= for every non-empty U∈τ and τ has a base of cardinality . We prove that G could be factorized G=AB (i.e. each g∈ G has unique representation g=ab, a∈ A, b∈ B) into dense subsets A,B, |A|=|B|=. We do not know if this statement holds for = 0 even if G is a topological group.
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